Materials

The skeletal remains used in this study are part of an osteological collection housed at Unitat d'Antropologia Biològica (Universitat Autònoma de Barcelona). The skeletons in this collection were ceded to Unitat d'Antropologia Biològica (Universitat Autònoma de Barcelona) by Cementiri de Granollers (Ajuntament de Granollers). This cession was subjected to prior agreement between both institutions. Moreover, this study is part of a project (CGL2008-00800/BOS), which was approved by Ministerio de Ciencia e Innovación (Gobierno de España).

Rotational efficiency was calculated for the right upper-limb skeleton (humerus, radius and ulna) of a 32-year-old male from the abovementioned collection. The E_rot of the studied individual was previously shown to be within to the human pattern of variation, calculated for full elbow extension (180°) and intermediate flexion (90°) [5]. The biomechanical model used in the current study enables to calculate E_rot as function of the elbow flexion angle by using 3D imaging techniques. NextEngine's 3D Scanner was used to obtain a three-dimensional image of the humerus, which was processed with ScanStudio HD software [8]. The image was exported to the modeling software Rhinoceros 4.0 SR1 [9], where planes and axes were defined and measurements were taken.

Calculation of pronator teres rotational efficiency

Galtés et al. [3] developed the biomechanical model to calculate the rotational efficiency (E_rot) of the pronator teres (PT), which was initially based on the use of CT scan images of the upper-limb. In accordance with this work, E_rot is defined by the expression:

The biomechanical model was later adapted to calculate E_rot using skeletal remains by means of photographs of the distal epiphysis of humerus [4]. Although this methodology was simple and practical, the technique was limited since the spatial representation of the humeral planes was not possible. Therefore, some assumptions about the arm and forearm mechanics and the representation of the geometrical points used to calculate E_rot had to be made. The use of 3D imaging, basically to define the humeral planes and axes and to determine important details of the medial epicondyle, enabled to obtain more accurate calculations of E_rot [5]. As a matter of fact, the calculation of E_rot at any elbow position described in the current paper is based on the approach developed by Galtés et al. [4] and Ibáñez-Gimeno et al. [5]. In order to calculate angles α and β at a given forearm and elbow position, several parameters are required (Table 1) [5]. Two of these parameters, l₁ distance and distance, depend on the value of carrying angle (λ) and thus vary throughout the flexion-extension range (Fig. 1) [10]. The carrying angle is the angle between the arm and the forearm long axes (Fig. 1). Assuming a linear variation of this angle between a maximum value (λ_m) in full elbow extension (180°), which is measured on dry bones [11], and λ = 0° in full elbow flexion (40°) [10], [12]–[14], and using and values (Fig. 1B) obtained from the three-dimensional image of the humerus, we can obtain: (Eq. 1)(Eq. 2)

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Figure 1. Representation of the influence of carrying angle (λ) on several parameters used to calculate rotational efficiency.

A: Anterior view of right distal arm and forearm bones in supination position. Humeral and forearm axes, the flexion-extension axis (FE axis), as well as the force exerted by pronator teres muscle (, from point A to point B), are represented. is the vertical component of pronator teres force. Point A indicates pronator teres distal enthesis just at the apex of radial curvature. Point B indicates its proximal attachment site, just at the apex of the medial epicondyle, and point B′ is the projection of point B on plane P₃. Planes P₁, P₂ and P₃ are parallel to each other and perpendicular to the forearm axis. P₁ passes through point B, P₂ passes through the most proximal point of the radial head and P₃ passes through point A. Point X is the intersection between humeral axis and a plane perpendicular to the humeral axis that passes through point B. Point C is the most distal humeral point of the humeral axis. Point O is the intersection between plane P₃ and the forearm axis. The dashed circle indicates the zoomed-in area of the right image. B: Detail of the left image. Plane P₂ is represented for a position of full elbow extension (P₂ (180°)) and for a position of full elbow flexion (P₂ (40°)). The variation of this plane is caused by the variation of the carrying angle (λ). This causes a variation in l₁ and in (Δl₁ (λ) and Δ (λ)), which depends on the elbow angle. Angle ω is the angle between plane P₂ (40°) and segment.

https://doi.org/10.1371/journal.pone.0090319.g001

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Table 1. Osteometric and geometric parameters used to calculate forearm rotational efficiency.

https://doi.org/10.1371/journal.pone.0090319.t001

Distance l₁ () is the sum of and (Figs. 1A and 2A). can be measured directly on the radius bone (Figs. 1A and 2A, l_pr), and can be obtained from: (i) geometric parameters obtained from the three-dimensional image of the humerus (R_c, d_e, ε, Fig. 2B); (ii) the position of the humeral medial epicondyle at each flexion angle (Fig. 2B), and (iii) the position of the elbow flexion axis, which depends on the carrying angle (λ) and varies throughout the flexion-extension range (see Fig. 1 and Eq. 1) [10]. Then, the distance l₁ in maximum elbow extension can be calculated as follows:

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Figure 2. Representation of the changes in position of point B as a function of the elbow angle.

A: Representation of the elbow in full extension (180°), an intermediate position (90°) and full flexion (40°) from a lateral view. A static radius (yellow) is represented with the humerus in the three positions (blue). Planes P₁, P₂ and P₃ are represented. The point (point B), and so plane P₁, are shown for 180° of elbow extension. Distance l_pr is the distance between planes P₂ and P₃. The distance between planes P₁ and P₂ depends on the elbow position. The square indicates the zoomed-in area of the right image. B: Change in the position of point B and in the distance as a function of the elbow angle. The position of point B for the three elbow angles is represented. Point B is positioned in a coordinates system (x, y) which center is the flexion-extension axis from a lateral point of view. R_c is the radius of the humeral condyle. d_e is the distance between the center of coordinates and point B. Angle ε is the angle between the positive x-axis and the position vector of point B.

https://doi.org/10.1371/journal.pone.0090319.g002

where Δl₁(λ₁₈₀) is obtained from Eq. 1. Distance is the curvature of the radius, measured on dry bone [4], [15]. Distance (projection of segment on plane P₃), is dependent on λ value and can be obtained for each position of the elbow using Eq. 2.

Then, and can be respectively calculated from and by determining distance [4]. Knowing the position of point B and its projection on plane P₃ (Fig. 3), we can calculate, at any flexion angle of the elbow, distance , angle β, and and, therefore, the value of E_rot.

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Figure 3. Diagram of plane P₃ with the main parameters to calculate rotational efficiency.

Two elbow positions (180° and 40°) are represented. is the projection of the pronator teres force on plane P₃. is the radial component of . is the component of tangential to the rotational movement. Angle β is the angle between and . Point A is the radial attachment site of pronator teres. Point O′ is the center of the rotational movement. Point B′ is the projection of point B on plane P₃. The position of this point varies as a function of the carrying angle of the elbow (Δ (λ), see Fig. S1) and it is assessed with regards to the horizontal axis by angle. The displacement of point B′ from the horizontal axis can be calculated from the variation of point B position as a function of the elbow angle (see Fig. 2).

https://doi.org/10.1371/journal.pone.0090319.g003

Rotational efficiency, force components and structural implications

In the current study, PT E_rot has been assessed throughout the entire flexion-extension range using three-dimensional technology. The variation of E_rot obtained from our innovative biomechanical model is in agreement with the results of kinematic studies using cadaveric specimens [16], [17] and virtual and resin models of the upper-limb skeleton [18]–[20], as well as with analysis on forearm discomfort [21] and on electromyographic signals of the forearm pronators [7].

Pronator teres E_rot is dependent on the skeletal structure of the arm, elbow and forearm, which in turn can be modified by the usage of this muscle. In this regard, the analysis of E_rot has enabled to study the effect of the components of PT force vector on the upper-limb skeleton. The perpendicular component of this vector () shows high relative values, which indicates that an important part of PT force is employed in a direction parallel to the rotational axis of the forearm, i.e. compressing the radius lengthwise towards the distal epiphysis of the humerus. This compression is also produced during the contraction of other upper-limb muscles, such as biceps brachii and the wrist and fingers flexors. As regards PT, the compressive effect on the radius is higher in pronation than in supination and slightly decreases from elbow extension to maximum flexion. Although the differences are slight, this indicates that pronated positions of the forearm enhance the curvature of the radius through radial compression in a greater degree than supinated positions. This effect is independent of the skeletal structure, as is broadly unaffected by changes in the parameters used to calculate E_rot.

When the forearm is pronated, biceps brachii is reflexly inhibited and plays little if any role in flexion, because it would supinate the forearm during contraction [22]–[24]. As mentioned, the perpendicular component of PT force is greater on the prone forearm. This increase may partially compensate the lack of action of biceps brachiii, enhancing the assisting role of PT as elbow flexor and joint stabilizer in this position.

The component , which directs to the rotation center, reaches negative values in forearm pronation. When this component is negative, the vector directs opposite to the rotational center, and so it enhances the curvature of the radius. Negative values are reached in a position of the forearm that gets closer to the neutral position as the elbow flexes. Therefore, the curvature of the radius () is enhanced during pronation in flexion rather than in extension of the elbow. In any case, the relative values for responsible for the curvature of the radius are low when compared to values for , which suggests that radii with marked curvatures are more probably associated to compression forces from PT, among other muscles, than to forces applied perpendicularly to the forearm axis. These findings are in agreement with a previous empirical study that revealed that the pattern of muscular loading exerted on the apex of the radial shaft curvature by the PT muscle plays an important role as a mechanical stimulus involved in diaphyseal bowing [15].

The effect that the skeletal structure and form have on E_rot and on the force vectors has also been assessed. The results show that a greater bowing of the radius entails an increase of E_rot. This is consistent with previous studies suggesting an enhancement of PT action and forearm rotational power by a markedly bowed radius [3], [25]–[28]. An increase of the radial curvature also causes that becomes negative in a more pronated position of the forearm, and so its modulus reach lower values in full pronation. Therefore, the radius is more easily bowed when its curvature is low.

The radial location of PT muscle also affects E_rot: at any elbow angle, E_rot increases when this enthesis is more proximally located, which is consistent with previous observations in full elbow extension [3]. Moreover, radii with a more proximal enthesis for PT muscle lead to the reach of negative values of closer to the neutral position of the forearm. Therefore, these radii entail lower negative values for this component, i.e. higher values for its modulus being the vector negative, which stimulates radial curvature.

Concerning the humeral medial epicondyle, E_rot also tends to increase in all elbow positions as this structure enlarges. Even though the current analysis uses a different approach to quantify humeral medial epincondylar projection (), the results are consistent with previous studies [3], [5], [29]. Moreover, an enlargement of the medial epicondyle has the same effect on than a more proximally located radial enthesis for PT, and therefore a more medially projected epicondyle enhances radial curvature.

The orientation of the medial epicondyle is also relevant for the determination of E_rot. The alteration of this orientation causes changes in that lead to changes in E_rot. A more posteriorly oriented epicondyle, i.e. more retroflexed [5], [30], is associated with a greater E_rot in full extension of the elbow, whereas an epicondyle with a lower degree of retroflexion has greater values of E_rot in full flexion. Moreover, a more proximally oriented epicondyle enhances E_rot in full flexion, whereas when it is more distally oriented, E_rot increases in extension. The orientation of the medial epicondyle was reported to present a partially activity-dependent plasticity, and so it was hypothesized that it can be modified to enhance certain abilities [30]. In this regard, and in agreement with the abovementioned relationship between E_rot and epicondylar orientation, a simple observation of the upper-limb positioning shows that a habitual and continued contraction of PT in full elbow flexion would reorient the epicondyle towards a more proximal position. Conversely, this reorientation would occur distally in full elbow extension. The reported association between the orientation of the medial epicondyle and E_rot may have important implications on the evolutionary pathway of the upper-limb skeleton, as this structure plays a central role in the locomotor diversity of primates [5], [31]–[33].

Regarding the carrying angle of the elbow [11], this is the first quantitative insight into its biomechanical implications on forearm rotation. An increase in this angle leads to lower values of E_rot. This effect is the greatest in full elbow extension and becomes lower as it is flexed, given that carrying angle is maximal in full extension, decreases during flexion and reaches 0° when the elbow is completely flexed [10], [12]–[14].

Functional implications of forearm rotation

The biomechanical model described here enables to make a thorough quantitative approach to clarify some mechanical aspects about the relationship between PT and forearm and elbow motion. For instance, the results indicate that maximal E_rot for each elbow angle is close to the neutral position of the forearm. This position has been commonly associated to the functional position, which minimizes the expenditure of muscular energy as it implies a natural equilibrium between antagonist muscles [10]. Moreover, it entails an enhancement of the precision of the grip, because the forearm axis is in line with the pronation-supination axis [10], [34].

Although skeletal structures with different morphologies can have the same E_rot, they do not have to imply the same abilities in terms of precision. For instance, if the same force is exerted by PT on two upper-limbs with the same E_rot, the one with the greatest curvature will be able to reach a lower rotational angle (File S1 and Fig. S1), and thus a greater rotational precision.

The stability of the elbow joint has relevant implications for sports medicine and other pathological conditions [14], [35], [36]. During pronation, plays an important role in the stability of the radio-ulnar joint (see File S1 and Fig. 3), whereas participates in the radio-humeral stability (see Fig. 1A). The global stability of the elbow is thus enhanced by the combination of both components. Although is slightly lower when the forearm is supinated, the great value in this position leads to a better fitting between the radius and the ulna than in pronation [37].

Rotational efficiency and the forces that act during pronation may be associated to the estimations of the discomfort levels done by Mukhopadhyay et al. [38], as the movements implying a high level of discomfort correspond to positions where E_rot is low. Moreover, the concept “efficiency” provides information about the rotational stability of a given position, as the work needed to modify the forearm rotational angle depends directly on the value of E_rot in each position (see File S1). For a given pronation movement, the model can be used to determine the trajectories of the hand that entail the minimal expenditure of energy for PT. In humans, pronation is usually performed when an object has been reached with the hand supinated and the elbow extended and is then brought closer to the body. The final position of this movement will entail a full flexion of the elbow and a close-to-neutral position of the forearm. This movement implies an increase of PT E_rot, which indicates that the energy expenditure of this muscle diminishes when the elbow is flexed (see Fig. 4B). The results show that a great part of this trajectory entails upper-limb positions where and have a similar value, i.e. around the forearm position where F″  =  F_r. This indicates that during this trajectory the forces that the elbow joint is submitted to are quite equilibrated.

These two conditions (equilibrium between forces and increase of E_rot) are not observed for other trajectories, such as those where the end point is close to full pronation with the elbow flexed. In this case, the final part of the trajectory entails a decrease of E_rot and very different values of these two force components. If the forearm was very regularly used to perform this movement with important mechanical loads, the disequilibrium could have pathological consequences, as a result of heavy tensions in the radio-ulnar proximal joint. In order to minimize the expenditure of energy and to rebalance the forces, the radial curvature could increase. As reported by our simulations, a rise of the curvature of the radius causes an increase of E_rot and a displacement of the position where F_r = 0 towards full pronation, as well as a displacement of the position where and become equal from supination towards a position closer to the neutral.

Therefore, the results of the current study also indicate that the upper-limb skeleton may experience plastic changes as a result of PT activity when it is used in positions where E_rot is low and forces are not equilibrated. These changes entail an improvement of these parameters, in order to adjust to the unfavorable conditions. Conversely, if the upper-limb is mainly used in positions with high E_rot values, PT will not trigger changes in the skeletal structure. Overall, E_rot and its relationship with energy expenditure and rotational stability, as well as the relative values of the force components, which are linked to the joint stability, provide a global insight into pronation and its association to the forearm skeletal structure. These findings will be useful for future analyses on ergonomics and orthopaedics of the upper-limb skeleton, as they provide relevant information about the relationship between PT functionality and the skeletal structure.

Applying this biomechanical model on studies about comparative anatomy of primate taxa would provide valuable information about the functional meaning of the upper-limb skeletal interspecific differences, which will probably be associated to the locomotor abilities of each taxon. Moreover, an analysis of PT E_rot and force components on a fossil primate would very useful for inferring its upper-limb involvement in locomotion.

Some skeletal parameters essential for the determination of PT functionality, such as the radial curvature and the medial epicondylar form, are reported to be plastic and related to the usage of PT muscle [15], [30]. Therefore, this biomechanical model would also be of great interest if applied to ancient human populations. Differences in parameters derived or related to E_rot between sexes, groups or populations would account for differences in occupational and habitual activities.